Pure states as a dual object for C*-algebras
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Publication:1166070
DOI10.1007/BF01961237zbMath0488.46050MaRDI QIDQ1166070
Publication date: 1982
Published in: Communications in Mathematical Physics (Search for Journal in Brave)
Related Items
Topologies and continuous functions on extreme points and pure states, Hereditary \(C^\ast\)-subalgebra lattices, Differential structure of certainC(X) xα Z, Differential structure of certainC(X) xα Z, A Hilbert bundle characterization of Hilbert C*-modules, Limits of pure states, Contextuality and noncommutative geometry in quantum mechanics, The twofold role of observables in classical and quantum kinematics, (No) Wigner Theorem for C*-algebras, Complements to various Stone-Weierstrass theorems for \(C^*\)-algebras and a theorem of Shultz, Remarks on the GNS Representation and the Geometry of Quantum States, THE GELFAND SPECTRUM OF A NONCOMMUTATIVE C*-ALGEBRA: A TOPOS-THEORETIC APPROACH, Transition probabilities of normal states determine the Jordan structure of a quantum system, On the nonlinear extension of quantum superposition and uncertainty principles, Poisson Spaces with a Transition Probability, Equivalent conditions for the general Stone-Weierstrass problem, Ortho-sets and Gelfand spectra, Pure state transformations induced by linear operators
Cites Work
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